Islamic University of Gaza Statistics and Probability for Engineers (ENGC 6310)

1. Islamic University of Gaza Statistics and Probability for Engineers (ENGC 6310) Lecture 2: District Random Variables and Probability Distribution Prof. Dr. Yunes Mogheir Civil and Environmental Engineering Dept. First Semester/2019

4. 3-2 Probability Distributions and Probability Mass Functions Definition

5. 3-3 Cumulative Distribution Functions Definition

6. Example 3-8

7. Example 3-8 Figure 3-4Cumulative distribution function for Example 3-8.

8. 3-4 Mean and Variance of a Discrete Random Variable Definition

9. 3-4 Mean and Variance of a Discrete Random Variable Figure 3-5A probability distribution can be viewed as a loading with the mean equal to the balance point. Parts (a) and (b) illustrate equal means, but Part (a) illustrates a larger variance.

10. 3-4 Mean and Variance of a Discrete Random Variable Figure 3-6The probability distribution illustrated in Parts (a) and (b) differ even though they have equal means and equal variances.

11. Example 3-11

12. 3-5 Discrete Uniform Distribution Definition

13. 3-5 Discrete Uniform Distribution Example 3-13

14. 3-5 Discrete Uniform Distribution Figure 3-7Probability mass function for a discrete uniform random variable.

15. 3-5 Discrete Uniform Distribution Mean and Variance

16. 3-5 Discrete Uniform Distribution

17. 3-6 Binomial Distribution Random experiments and random variables

18. 3-6 Binomial Distribution Random experiments and random variables

19. 3-6 Binomial Distribution Definition

20. 3-6 Binomial Distribution Figure 3-8Binomial distributions for selected values of n and p.

23. 3-6 Binomial Distribution Example 3-18

24. 3-6 Binomial Distribution Example 3-18

25. 3-6 Binomial Distribution Question

26. 3-6 Binomial Distribution Mean and Variance

27. 3-6 Binomial Distribution Example 3-19

28. 3-7 Geometric Distribution Example 3-20

29. 3-7 Geometric Distribution Definition

30. 3-7 Geometric Distribution Figure 3-9. Geometric distributions for selected values of the parameter p.

32. 3-7 Geometric Distribution 3-7.1 Geometric Distribution Example 3-21

33. 3-7 Geometric Distribution Definition

34. 3-7 Geometric Distribution Example 3.22

35. 3-9 Poisson Distribution Definition

36. Poisson Distribution • Occurrence of random event in continuous dimension of time and space • Natural disasters • Earthquakes • Request for services (bank, airport, market counters) • Car arrivals at intersection • The probability of x occurrences per unit time • Assumptions • Possible to divide the time interval into very small subintervals so as P( occurrence in each sub-interval is very small ) • P(x) in each sub-interval is constant • P( two or more occurrences in sub-interval ) is ignored • Independent

37. 3-9 Poisson Distribution Applications: • Intervals: • Length • time, • area, • volume • Counts: • particles of contamination in semiconductor • flaws in rolls of textiles, • calls to a telephone exchange, • power outages, and • atomic particles emitted from a specimen

40. 3-9 Poisson Distribution Consistent Units

41. 3-9 Poisson Distribution

42. 3-9 Poisson Distribution Example 3-33

43. 3-9 Poisson Distribution Example 3-33

44. 3-9 Poisson Distribution Mean and Variance

45. End of lecture 2